Kia has 2 1/4 pounds of peppermint candies. She wants to put them in small bags, each about 3/8 of a pound . How many small bags of candies can she make?

Answer:

P ( 500<X<650 ) = 0.8577

Step-by-step explanation:

Since μ=572 and σ=51 we have:

P ( 500<X<650 ) = P ( 500−572< X−μ<650−572 )

[tex]\RightarrowP ( \frac{500-572}{51} < \frac{x-\mu}{\sigma} < \frac{650-572}{51})[/tex]

⇒ P ( 500<X<650 ) = P ( −1.41<Z<1.53 )

Now, Using the standard normal table to conclude that:

P ( −1.41< Z <1.53 ) = 0.8577

Final answer:

Approximately 85.77% of Indiana tenth-grade students scored between 500 and 650 on the English/language arts ISTEP exam, as calculated by converting the given scores to z-scores and finding the proportion within the standard normal distribution.

Explanation:

To find the proportion of Indiana tenth-grade students who scored between 500 and 650 on the English/language arts exam, given that the ISTEP scores are approximately normal with a mean (μ) of 572 and a standard deviation (σ) of 51, we can use the standard normal distribution.

First, we'll convert the scores to z-scores using the formula z = (X - μ) / σ where X is the score.

Then we'll look up these z-scores in a standard normal distribution table or use a calculator with normal distribution functions to find the proportion of students whose scores fall between these two z-scores. The table or calculator will provide us with the areas under the curve to the left of each z-score.

Let's assume the area to the left of z=-1.41 is approximately 0.0793 (7.93%) and to the left of z=1.53 is approximately 0.937 (93.7%). To find the proportion between 500 and 650, we'll subtract the smaller area from the larger one:

Proportion = Area to the left of z=1.53 - Area to the left of z=-1.41 = 0.937 - 0.0793 = 0.8577 or 85.77%

Therefore, approximately 85.77% of the students scored between 500 and 650 on the ISTEP English/language arts exam.

Answer:

Third option given

Step-by-step explanation:

On a coordinate plane, a parabola opens to the right with a vertex at (0, 0).

use the following x values to plot the associated y values on the x-y plane:

If x = 0,  then [tex]y=\sqrt{0}  =0[/tex]

If x = 1,  then [tex]y=\sqrt{1}  =1[/tex]

If x = 4,  then [tex]y=\sqrt{4}  =2[/tex]

If x = 9,  then [tex]y=\sqrt{9}  =3[/tex]

Join the points and you will find a branch of a parabola opening to the right.

Answer:

The Answer is D

Step-by-step explanation:

on e2020 its the last graph

Answer:

Production has increased 20/day

Step-by-step explanation:

In the first scenario production is 500/day and productivity 25 set/hour. After the changes, production is 600/day and 25 set/hour.

So productivity remains the same, nevertheless, as there are more productive hours per day, production raises, in this case the can be calculated as (New Production-Old Production)/Old Production=(600-500)/500=100/500=0.2=20%.

As productivity remains the same, you do not ge more sets/shift, as shifts are shorter (8 instead of hours, so you get 200/shift instead of 250/shift). The rest of the option is false as productivity remains constant

Answer:

  Any of 7,111,777 or 7,333,555 or 7,555,333 or 7,777,111.

Step-by-step explanation:

The first digit must be 7. The sum of the unknown digits is then 31-7 = 24. Since this represents 3 pairs of digits (a thousands period digit and a units period digit), each pair must total 24/3 = 8.

There are two ways that odd numbers can total 8: 1+7 = 3+5 = 8. Since there is no restriction on the digits other than they must be the same in any period and they must be odd, there are 4 ways the 2 pairs of digits can be arranged into a number:

Answer:

  32 mi @ N77°E

Step-by-step explanation:

The route of travel forms legs of a right triangle, so the final distance (d) from harbor can be found using the Pythagorean theorem:

  d² = 28² +16² = 784 +256 = 1040

  d = √1040 ≈ 32.249 . . . miles

___

The angle (α) added to the original N47°E bearing can be found using the fact that opposite and adjacent sides are given. So, they can tell you the tangent of the angle:

  tan(α) = 16/28

  α = arctan(16/28) ≈ 29.74°

Then the bearing to the final position is ...

  47° +29.74° = 76.74°  . . . . . east of north

Rounded to whole numbers, the final position from harbor is ...

  32 miles @ N 77° E

Answer:

  Jon can plot the ratio of 5 to 6 on a graph (5, 6), then move up 6 and right 5 to find the next frame size, and then keep the same rate to find other points.

Step-by-step explanation:

A line from the origin to the point (5, 6) has a slope of 6/5. To find other points on the same line, one would need to continue to rise 6 units for each run of 5 units to the right.

The only answer choice that appropriately matches (x, y) values to rise/run values is the one shown above.

_____

Comment on this answer

The slope of the line described in this answer is 6/5, which seems appropriate for a frame that is 6 inches high and 5 inches wide. However, I would call this a plot of the ratio 6 to 5, rather than the ratio 5 to 6.

Answer:

Jon can plot the ratio of 5 to 6 on a graph (5, 6), then move up 6 and right 5 to find the next frame size, and then keep the same rate to find other points.

i hope this helps!

Answer:

Hi, my friend! The answer to this questions are "0.125" and "12.5%"

Step-by-step explanation:

First, if you divide 1 by 8 using a calculator, you will see that the result will be 0.125. Also, the option 12,5% is correct because de symbol "%" means "divided by 100". If you check in the calculator, 12.5 divided by 100 will also be 0.125.

Hoping to be clear! Good luck!

Final answer:

Only 0.125 and 12.5% are equivalent to the fraction 1/8. This is because they both reflect a '125-like' number pattern which is crucial when identifying representations of 1/8 in decimal or percentage form.

Explanation:

The fraction 1/8 is equivalent to a few different representations in decimal and percentage forms.

To identify which options among 0.125, 0.18, 12.5%, and 1.25% are equivalent to 1/8, we should look for a number pattern resembling '125' as it indicates a connection to the fraction 1/8 or its reciprocal nature.

So, 0.125 is exactly 1/8 as a decimal, and 12.5% represents 1/8 in percentage form because 12.5% is 12.5 parts per 100, which can be equated to 125 parts per 1000, resembling the multiplication of 1000 by the reciprocal of 8, that is 0.125.

Therefore, the options 0.125 and 12.5% are equivalent to 1/8.

Answer:

The answer to your question is: Henry gets £ 78

Step-by-step explanation:

Data

Henry = H

Gavin = G

Jim = J

Henry + Gavin + Jim = £ 130

H = 2G

G = 3J

Process

Write an equation in terms of G

                                H + G + J = 130

                               2G + G + G/3 = 130

Solve it for G

                            3( 2G + G + G/3 = 130)

                            6G + 3G + G = 390

                             10G = 390

                                 G = 390 / 10

                                 G = £39  

                           H = 2G = 2(39)

                                    H = £78

                                   J = G/3

                                   J = 39/3

                                   J = £13                        

Final answer:

By setting up and solving algebraic equations, we find that Henry receives £78, which is twice the amount that Gavin receives and six times the amount that Jim receives from the total sum of £130.

Explanation:

Let's solve the problem by denoting Jim's share of the money as x. According to the problem, Gavin gets triple the amount of money that Jim gets, which means Gavin gets 3x. Henry gets twice as much as Gavin, so he gets 2(3x) or 6x. The total amount of money is £130 and the sum of their shares is x + 3x + 6x = 10x. Setting up the equation:

10x = £130,

we find that x, Jim's share, is £130/10 = £13. Gavin's share is 3 times Jim's: 3 × £13 = £39, and Henry's share is 6 times Jim's: 6 × £13 = £78. So Henry gets £78.

Answer:

  8x + 3(20 - x) = 5(20)

Step-by-step explanation:

If x represents the number of pounds of $8 chocolates, then (20-x) is the number of pounds of $3 chocolates. The cost of the mix attributable to the $8 chocolates will be 8x, and the cost associated with the $3 chocolates will be 3(20-x). The sum of these costs is the cost of the 20 pounds of mix: $5×20.

In equation form, this is ...

  8x + 3(20-x) = 5(20)

_____

The solution is x=8, so 8 lb of $8 chocolates should be mixed with 12 lb of $3 chocolates to make a mix worth $5 per pound.

Final answer:

The correct equation to determine the pounds of each type of chocolate for the mixture is 8x + 3(20 - x) = 5(20), where x represents the pounds of the $8 chocolate.

Explanation:

To solve for how many pounds of each type of chocolate should be used in the mixture, let's designate x as the number of pounds of the $8 chocolate and 20-x as the number of pounds of the $3 chocolate. The total cost of the $8 chocolate will be 8x dollars, and the total cost of the $3 chocolate will be 3(20-x) dollars. The total sales price for the 20-pound mixture must be $5 per pound, which equals $100 (since 20 pounds × $5 per pound = $100). Therefore, the correct equation that represents the situation is 8x + 3(20 - x) = 5(20).

Let's break down this equation:

The $8 chocolate: 8x dollars

The $3 chocolate: 3(20 - x) dollars

Total cost: 8x + 3(20 - x)

The mixture sells for: $5 × 20

The equation balances the cost of both chocolates with the selling price of the mixture.

Answer:

B

Step-by-step explanation:

Giving away money because individuals loan dollars to other entitles at a a cost

Answer:

  D.  lending money

Step-by-step explanation:

It depends on the institution. A "for profit" financial institution has the purpose of making money for its investors. To do that, it offers a variety of money-oriented services, some involving payments to customers (interest) and some involving charging customers for the service (fees or interest).

A service offered in the latter category is "lending money."

__

A "not for profit" financial institution has the purpose of providing financial services to its members. Again, some of these services may involve payments to customers, and others may involve collecting interest or fees from customers. These institutions, too, offer the service of "lending money."

__

Among the services a financial institution may offer that do not involve lending money are ...

Answer:

Step-by-step explanation:

Probability of getting the newspaper on his front porch = P(A) = 0.64

Probability of finding the newspaper on his  lawn = P(B) =? (We don't know, this is what we have to find.)

Total probability = 1

Formula, P(A) + P(B) = 1

Let's put all values in this formula,

              0.64 + P(B) = 1

              P(B) = 1 - 0.64

              P(B) = 0.36

Thus, the probablity that Mr. Johnson finds his newspaper on his lawn is 0.36 or 36%.

Answer:

(a) What is the research objectives?

B. To determine the number of adults in the country who believe the federal government wastes 51 cents or more of every dollar.

(b) What is the population?

C. Adults in the country aged 18 years or older.

(c) What is the sample?

D. The 1019 adults in the country that were surveyed.

D. The 1019 adults in the country that were surveyed. The research objective is to determine the number of adults in the country who believe the federal government wastes 51 cents or more of every dollar. The population is adults in the country aged 18 years or older. The sample is the 1019 adults in the country that were surveyed.

The research objective of the survey conducted by the news service is B. To determine the number of adults in the country who believe the federal government wastes 51 cents or more of every dollar.

The population in this study is C. Adults in the country aged 18 years or older.

The sample in this study is D. The 1019 adults in the country that were surveyed.

Answer:

The actual area of the park is 21,600 miles square.

Step-by-step explanation:

Step 1: Calculate the area of the park

Area of rectangle = Length x width

Length = 4 inches

Width = 6 inches

Scale factor is given as, 1 inch = 30 miles.

So, converting the length and width in miles by using the scale factor, we get

Length = 4 * 30 = 120 miles

Width =  6 * 30 = 180 miles

The formula of finding the area of an rectangle is:

Area = length x width

By putting the values in equation, we get

Area = 120 x 180

Area = 21,600 miles square

Therefore, the actual area of the park is 21,600 miles square.

Answer: Option 'D' is correct.

Step-by-step explanation:

Since we have given that

First term = 13

Increase each time = 20

Number of clients = 25

So, it forms an arithmetic progression:

So, 25 th term would be

[tex]a_{25}=a+(n-1)d\\\\a_{25}=13+(25-1)\times 20\\\\a_{25}=13+24\times 20\\\\a_{25}=13+480\\\\a_{25}=493[/tex]

Hence, list would look like 13,33,............493.

Therefore, Option 'D' is correct.

Answer:

[tex]x=(c-60)/85[/tex]

Step-by-step explanation:

we have

[tex]c=85x+60[/tex]

Solve for x

That means -----> isolate the variable x

subtract 60 both sides

[tex]c-60=85x+60-60\\c-60=85x[/tex]

Divide by 85 both sides

[tex](c-60)/85=85x/85\\(c-60)/85=x[/tex]

Rewrite

[tex]x=(c-60)/85[/tex]

Answer:

20

Step-by-step explanation:

8/2 = 4

4 * 5 = 20

Answer:

The answer to your question is: 5/8

Step-by-step explanation:

data

5/14 divided by 4/7

Process

                        [tex]\frac{5}{14\\}[/tex]

                        [tex]\frac{4}{7}[/tex]

multiply 5 and 7 and the result is the numerator

multiply 14 and 4 and the result is the denominator

                            (5 x 7) / ( 14 x 4)

                            35 / 56

                            5 / 8              simplify both numerator and denominator

Answer:

He is correct.

Step-by-step explanation:

Because a linear system in three variables means that they have solutions if the all three have points in common in R3 space. But, in the case that they don't have any solution mean the opposite, they don't have points in common in R3 space.

In a linear system, variables must be related through common points. So, graphically, you should draw intersecting geometrical places in order to show the intersections, wich are the common results or points that are the solutions of the linear system.

A linear system of equation in three variables has no solution is the correct statement.

" Linear equation is defined as the equation whose variables with highest degree one."

According to the question,

Given statement,

A linear system of equation in three variables has no solution.

Verification:

Consider a example of linear system of equation with three variables

[tex]2x-4y +z=3 \ \ \ \ \ \ \ \ \ \ \ \ \ \ (1)[/tex]

[tex]8x-2y+ 4z=7 \ \ \ \ \ \ \ \ \ \ \ \ \ (2)[/tex]

[tex]-4x+y -2z=-14\ \ \ \ \ \ \ \ \ \ (3)[/tex]

Solve linear equation to get the solution

Multiply [tex](3)[/tex] by [tex]2[/tex] and add it to [tex](2)[/tex],

[tex]\ \ 8x-2y+ 4z=7\\\\-8x+2y-4z =-28[/tex]

we get,

[tex]0x+0y + 0z = -21[/tex]  which is not possible and has no solution.

Hence, linear system of equation has no solution is the correct statement.

Learn more about linear equation here

brainly.com/question/11897796

#SPJ2

Genghis Khan's army organizational structure can be used to calculate the total number of men under him: For an army of 10,000 soldiers, the total is 11,110 men; for an army of 5,763 soldiers, it is 6,404 men.

To solve both parts of the student's question, we use the military organizational structure implemented by Genghis Khan that is based on the 'decimal' system. We start with the lowest level groups of 10 soldiers and move up in orders of magnitude (10, 100, 1,000, and 10,000).

Part (a): Army of 10,000 soldiers

Groups of 10: There are 1,000 groups of 10 in an army of 10,000 soldiers.

Leaders of 10: Each group of 10 has 1 leader, resulting in 1,000 leaders of 10.

Groups of 100: 1,000 leaders of 10 make up 100 groups of 100 (because 1,000/10 = 100).

Leaders of 100: There are 100 leaders of 100.

Groups of 1,000: 100 leaders of 100 make up 10 groups of 1,000 (because 100/10 = 10).

Leaders of 1,000: There are 10 leaders of 1,000.

Adding it all together: 10,000 soldiers + 1,000 leaders of 10 + 100 leaders of 100 + 10 leaders of 1,000 = 11,110 total men under the command of Khan for an army of 10,000.

Part (b): Army of 5,763 soldiers

Groups of 10: There are 576 full groups of 10 and 1 incomplete group (with 3 soldiers), resulting in 577 groups.

Leaders of 10: There are 577 leaders of 10.

Groups of 100: 577 leaders of 10 make up 57 full groups of 100 and 1 incomplete group (with 7 leaders of 10), resulting in 58 groups.

Leaders of 100: There are 58 leaders of 100.

Groups of 1,000: 58 leaders of 100 make up 5 full groups of 1,000 and 1 incomplete group (with 8 leaders of 100), resulting in 6 groups.

Leaders of 1,000: There are 6 leaders of 1,000.

Adding it all together: 5,763 soldiers + 577 leaders of 10 + 58 leaders of 100 + 6 leaders of 1,000 = 6,404 total men under the command of Khan for an army of 5,763 soldiers.

Answer:

The number of child tickets sold was 43 and the number of adult tickets sold was 20

Step-by-step explanation:

Let

x ----> the number of child tickets sold

y ----> the number of adult tickets sold

we know that

[tex]x=3y-17[/tex] -----> equation A

[tex]8x+12y=584[/tex] ----> equation B

Solve the system by graphing

Remember that the solution is the intersection point both graphs

The solution is the point (43,20)

see the attached figure

therefore

The number of child tickets sold was 43 and the number of adult tickets sold was 20

Answer:

Number of child tickets sold = 43

Number of adult tickets sold = 20

Step-by-step explanation:

Let the number of child ticket be c and number of adult ticket be a,

Given that the number of $8 child tickets is 17 less than 3 times the number of $12 adult tickets,

      c = 3a - 17

        3a - c = 17 ----------------------eqn 1

The theater received $584

That is

       8 c + 12 a = 584 ----------------------eqn 2

  eqn 2 /4

       2 c + 3 a = 146 ----------------------eqn 3

eqn 3 - eqn 1 gives

             2 c + 3 a - (3a - c) = 146 - 17

               3 c = 129

                   c = 43

Substituting in eqn 1    

           3 x a - 43 = 17

            3a =  60

               a = 20

Number of child tickets sold = 43

Number of adult tickets sold = 20

Answer:

The intersection is 10

Step-by-step explanation:

You just have to look at them and see what number is in all the sets.

Answer:

the answer is 10

After 22 s, the car has velocity

[tex]v=\left(1.7\dfrac{\rm m}{\mathrm s^2}\right)(22\,\mathrm s)=36.4\dfrac{\rm m}{\rm s}[/tex]

In this time, it will have traveled a distance of

[tex]\dfrac12\left(1.7\dfrac{\rm m}{\mathrm s^2}\right)(22\,\mathrm s)^2=411.4\,\mathrm m[/tex]

Over the next 29 s, the car moves at a constant velocity of 36.4 m/s, so that it covers a distance of

[tex]\left(36.4\dfrac{\rm m}{\rm s}\right)(29\,\mathrm s)=1055.6\,\mathrm m[/tex]

so that after the first 51 s, the car will have moved 1467 m.

After the 29 s interval of constant speed, the car's negative acceleration kicks in, so that its velocity at time [tex]t[/tex] is

[tex]v(t)=36.4\dfrac{\rm m}{\rm s}+\left(-5.8\dfrac{\rm m}{\mathrm s^2}\right)t[/tex]

The car comes to rest when [tex]v(t)=0[/tex]:

[tex]36.4-5.8t=0\implies t=6.3[/tex]

That is, it comes to rest about 6.3 s after the first 51 s. In this interval, it will have traveled

[tex]\left(36.4\dfrac{\rm m}{\rm s}\right)(6.3\,\mathrm s)+\dfrac12\left(-5.8\dfrac{\rm m}{\mathrm s^2}\right)(6.3\,\mathrm s)^2=114.2\,\mathrm m[/tex]

so that after 57.3 s, the total distance traveled by the car is 1581.2 m, or about 1.6 km.

Answer:

y= (h(6)-h(4))/2x +C

Where C=-2*h(6)+3*h(4)

Step-by-step explanation:

The secant line is the line that meets a function (in this case h(x) ) in two points, so we have to apply the ecuation of a straigt line that meets two points:

y-y1 = (y2-y1)/(x2-x1) * (x-x1)

In this case X1=4 , x2=6, y1 = h(4) and y2= h(6)

So

y-h(4)= 1/2 (h(6)-h(4)) * (x-4)

y-h(4)= 1/2 (h(6)-h(4)) x- 2 *(h(6)-h(4))

y-h(4)= 1/2 (h(6)-h(4)) x- 2 (h(6) + 2h(4))

y= 1/2 (h(6)-h(4)) x- 2 h(6) + 2h(4) + h(4)

y= 1/2 (h(6)-h(4)) x- 2 h(6) + 3h(4)

Good Luck!

*****************************************************************************

Dont forget to rate my answer if it was helpful!

Answer:

The range of g(x) is y > 0

The ranges of f(x) and h(x) are different from the range of g(x)

Step-by-step explanation:

we have

[tex]f(x)=-(\frac{6}{11})^{x}[/tex]

[tex]g(x)=(\frac{6}{11})^{-x}[/tex]

[tex]h(x)=-(\frac{6}{11})^{-x}[/tex]

Using a graphing tool

see the attached figure

Verify each statement

case A) The range of h(x) is y > 0.

The statement is false

The range  of h(x) < 0

case B) The range of g(x) is y > 0.  (Note the statement is The range of g(x) is y > 0 instead of  The domain of g(x) is y > 0)

The statement is true (see the attached figure)

case C) The ranges of f(x) and h(x) are different from the range of g(x)

The statement is true (see the attached figure)

Because

The ranges of f(x) and h(x) are y < 0

and

The range of g(x) is y > 0

case D) The domains of f(x) and g(x) are different from the domain of h(x)

The statement is false

The domain of the three functions is the same

Answer:

OPTION C.The ranges of f(x) and h(x) are different from the range of g(x).

Step-by-step explanation:

Answer:

Step-by-step explanation:

Easy. its [tex]x^{2} \int\limits^a_b {x} \, dx \\ \\ \left \{ {{y=2} \atop {x=2}} \right. \\ \neq \frac{x}{y} \beta \al\left \{ {{y=2} \atop {x=2}} \right. pha \neq \left[\begin{array}{ccc}1&2&3\\4&5&6\\7&8&9\end{array}\right] \left[\begin{array}{ccc}1&2&3\\4&5&6\\7&8&9\end{array}\right] \geq \\ \left \{ {{y=2} \atop {x=2}} \right. \left[\begin{array}{ccc}1&2&3\\4&5&6\\7&8&9\end{array}\right][/tex]

The inequality that represents the graph is:

                        [tex]y\geq x+3[/tex]

By looking at the graph we observe that the graph is a solid line which passes through the point (-1,0) and (1,2).This means that the inequality is a inequality with a equality sign(i.e. not strict)

This means that the equation of line is:

[tex]y-2=\dfrac{2-0}{1-(-1)}\times (x-(-1))\\\\y-2=\dfrac{2}{2}\times (x+1)\\\\y-2=x+1\\\\y=x+1+2\\\\y=x+3[/tex]

The shaded region is away from the origin.

This means that the inequality does not pass the zero test.

Hence, the inequality is:

               [tex]y\geq x+3[/tex]

Answer:

  1071.30 per month

Step-by-step explanation:

The multiplier each year is 1 + .03 = 1.03. After 6 years, the cost has been multiplied by that factor 6 times, so has been multiplied by 1.03⁶ ≈ 1.194052.

  $897.20 × 1.194052 ≈ $1071.30

The typical family of four should expect to spend $1,056.27 per month for food six years from now.

1. Calculate the inflation factor using the formula: [tex]\( (1 + \text{inflation rate})^{\text{number of years}} \).[/tex]

  - Inflation rate = 3% or 0.03

  - Number of years = 6

  - Inflation factor = [tex]\( (1 + 0.03)^6 = 1.191016 \)[/tex]

2. Multiply the current monthly food expenditure by the inflation factor to find the expected expenditure six years from now.

  - Current expenditure = $897.20/month

  - Expected expenditure = $897.20 × 1.191016 = $1,056.27/month

Therefore, the typical family of four should expect to spend $1,056.27 per month for food six years from now if inflation occurs at a rate of 3% per year.

Answer:

m= 6 or m= 8. I'm not sure if its multiple choice, but that's what I got.

Answer:

m=6,8

Step-by-step explanation:

Answer:

2 stations with 7 of jugs of water and 10 of sports drink in each station

Step-by-step explanation:

Lets start with the jugs of water, to have the same amount in each station you need have a number of station that divide for 14 the remainder or "left over" equal to 0, or in other words multiple of 14 in the interval 1 to 14

multiples of 14 : 1, 2, 7 and 14

so you can have

1 station with 14 jugs of water

2 stations with 7 jugs of water each

7 stations with 2 jugs of water each

14 station with 1 jugs of water each

Now we need to do the same for the 20 jugs of sports drink

multiple of 20 in the interval 1 to 20: 1,2,4,5,10 and 20

so you can have:

1 station with 20 jugs of sports drink

2 stations with 10 jugs of sports drink

4 stations with 5 jugs of sports drink

5 station with 4 jugs of sports drink

10 station with 2 jugs of sports drink

20 stations with 1 jugs of sports drink

So we have that both cases, water and sport drinks have coincidence of 1 or 2 stations, and the maximum of both is 2 stations with 7 jugs of water and 10 of sports drink each

Final answer:

To determine the greatest number of refreshment stations that can be set up, we find the greatest common divisor (GCD) of 14 jugs of water and 20 jugs of sports drink, which is 2. Therefore, the committee can set up 7 refreshment stations with 1 jug of water and 2 jugs of sports drink at each.

Explanation:

The committee has 14 jugs of water and 20 jugs of sports drink and wants to set up the greatest number of refreshment stations along the marathon course without any beverages left over. To find this solution, we need to determine the greatest common divisor (GCD) of the two quantities of jugs because each station must have the same combination of jugs of water and sports drink.

First, list the factors of each number:

Factors of 14: 1, 2, 7, 14

Factors of 20: 1, 2, 4, 5, 10, 20

The largest common factor is 2, which means the refreshment stations can have a combination of 1 jug of water and 2 jugs of sports drink. So, the committee can set up 7 refreshment stations (14 jugs of water / 2 per station = 7 stations; and 20 jugs of sports drink / 2 per station = 10 stations, but limited by the smaller number of jugs of water).

Answer:

The answer to your questions is: 25 new teachers

Step-by-step explanation:

Data

# of students = 2000

ratio = 3:80 teachers to students

New teachers = ?

Process

I suggest to use rule of three to solve this problem

                     3 teachers ----------------  80 students

                      x                ----------------  2000 students

                  x = (2000 x 3) / 80 = 75 teachers

               Number of initial teachers = 75

The ratio change to 1:20

                     1 teacher -------------------  20 students

                     x             -------------------   2000 students

                     x = (2000 x 1) / 20

                    x = 100 teachers

Number of new teachers = 100 - 75 = 25